COMPUTING THE A-POLYNOMIAL USING NONCOMMUTATIVE METHODS
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Publication:5709033
DOI10.1142/S0218216505004068zbMath1081.57012MaRDI QIDQ5709033
Publication date: 21 November 2005
Published in: Journal of Knot Theory and Its Ramifications (Search for Journal in Brave)
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Related Items (4)
The action of the Kauffman bracket skein algebra of the torus on the Kauffman bracket skein module of the 3-twist knot complement ⋮ An explicit formula for the \(A\)-polynomial of the knot with Conway's notation \(C(2n,4)\) ⋮ Varieties via a filtration of the KBSM and knot contact homology ⋮ SOME RESULTS ABOUT THE KAUFFMAN BRACKET SKEIN MODULE OF THE TWIST KNOT EXTERIOR
Cites Work
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- Varieties of group representations and splittings of 3-manifolds
- Plane curves associated to character varieties of 3-manifolds
- Rings of \(SL_2(\mathbb{C})\)-characters and the Kauffman bracket skein module
- Representation theory and the \(A\)-polynomial of a knot
- The A-polynomial from the noncommutative viewpoint
- On the relation between the A-polynomial and the Jones polynomial
- REMARKS ON THE A-POLYNOMIAL OF A KNOT
- THE NONCOMMUTATIVE A-IDEAL OF A (2, 2p + 1)-TORUS KNOT DETERMINES ITS JONES POLYNOMIAL
- Skein modules and the noncommutative torus
- THE (2, ∞)-SKEIN MODULE OF THE COMPLEMENT OF A (2, 2p+1) TORUS KNOT
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